%PDF-1.4
%
1 0 obj
<>stream
iText 4.2.0 by 1T3XT2019-07-27T21:41:58+05:30Arbortext Advanced Print Publisher2019-08-20T10:24:48-07:002019-08-20T10:24:48-07:00uuid:8addd02c-2a8d-4824-a074-0375b52bef83uuid:9735c38c-787b-4f5b-aca7-e8422204bc96JournalCommunications in Partial Differential Equations© 2019 Taylor & Francis Group, LLC0360-53021532-413344111186-12161186121610.1080/03605302.2019.1626420https://doi.org/10.1080/03605302.2019.1626420application/pdf10.1080/03605302.2019.1626420en-USLocalization of eigenfunctions via an effective potentialTaylor & FrancisCommunications in Partial Differential Equations, 2019. doi: 10.1080/03605302.2019.1626420Arnold Douglas N.David GuyFiloche MarcelJerison DavidMayboroda SvitlanaAgmon distance; Schrodinger equation; spectrum; the landscape of localizationVoR2019-07-09truewww.tandfonline.com10.1080/03605302.2019.1626420www.tandfonline.comtrue2019-07-0910.1080/03605302.2019.1626420
endstream
endobj
4 0 obj
<>stream
xYɎ7W"k_`^d>x8~HTmx7TUv[.KThCh;cg<T
fF.0a9cw'qރ}}>_&ag8G<58sDL4pI/ZզZs
k
߾}AUs[=YrO>(ΓzC5WjĹ4C8m}9OLD_>-1+|zϼ1fm]SqvrLgujI:&mpHeF0zR2d3nYwkFWOCwF"mhXןv?S6?Ӊiti~䂎 +뒶fI7??YuviYv#R/Ɵ6ǢBYٸD!R-u*Fx*/fZ}(e=A9
\Q9f33~YF.,*}8HXhmwuL fyKd>X/zϫKݹ >i_f+lm.T*~ى{Lơ;6^Iw`cΝI-{{0dPη 5RVmնC^ad/ya0k>B5nib%딑vsB9Lއv:߈X= c/ hNAC@r of:φ瓀\
UPSVZ͠^l7B<8}Bzx'vc9hSC/
u撷k /ear' 5hg휗ftIz-Xkt(ܞm4ɕlsm9G_'Hmea7؉PD<4vVΤl7Y"u0\83Ԓ8,b]|e\=|AwؿE
$Y^mqv 1j]N2|J\*J-H2IA(ڪ#ڤ5
)$b>/#;Qy"[FQ$ 7ymeltF-W;1&T$e$|#IG%Twޛ#*!6\iC]
/1mkAn{EDOXRoBu=iAi,fMɶ[xZ+Y3cP7=¬5mMl.nE%Awc5Ksm;WL櫘ڒg[Ly`h;BYVvPabh"K]u\1;\K*6orhGI핞m]);vK`Vʉ)xrjAH]_or>stream
xwXSsN`$!l{@ ٢ $@TR)XZԉ(
RZD|y L0V@(#q `= nnWXX0+Зȕ;ѫ R1{Ol (Lγx\䜙/V'LKP0RX~@9k(8u?̰yBOΑr y
<)_Έ"<?_l)
F+s9H
MI #~__ Q$.R$sŅg%f,a6GTLΟEQԖ!/Bſ)EogEA?l kJ^-ؒ \?l{ P&d\EAt{6~/ÇfJq2bFn6g0<8aO"yD|TyE